Scalable tomography of many-body quantum environments with low temporal entanglement

TL;DR

This paper presents a hybrid quantum-classical algorithm for efficiently reconstructing the influence matrix of many-body quantum environments, enabling scalable modeling of complex quantum dynamics with limited measurements.

Contribution

It introduces a machine learning approach to reconstruct influence matrices of large many-body environments on a quantum processor, leveraging low temporal entanglement for scalability.

Findings

Successfully reconstructs influence matrices for long evolution times.

Enables modeling of quantum transport in complex environments.

Demonstrates feasibility with 1D spin-chain environments.

Abstract

Describing dynamics of a quantum system coupled to a complex many-body environment is a ubiquitous problem in quantum science. General non-Markovian environments are characterized by their influence matrix~(IM) -- a multi-time tensor arising from repeated interactions between the system and environment. While complexity of the most generic IM grows exponentially with the evolution time, recent works argued that for many instances of physical many-body environments, the IM is significantly less complex. This is thanks to area-law scaling of temporal entanglement, which quantifies the correlations between the past and the future states of the system. However, efficient classical algorithms for computing IM are only available for non-interacting environments or certain interacting 1D environments. Here, we study a learning algorithm for reconstructing IMs of large many-body environments simulated on a quantum processor. This hybrid algorithm involves experimentally collecting quantum measurement results of auxiliary qubits which are repeatedly coupled to the many-body environment, followed by a classical machine-learning construction of a matrix-product (MPS) representation of the IM. Using the example of 1D spin-chain environments, with a classically generated training dataset, we demonstrate that the algorithm allows scalable reconstruction of IMs for long evolution times. The reconstructed IM can be used to efficiently model quantum transport through an impurity, including cases with multiple leads and time-dependent controls. These results indicate the feasibility of characterizing long-time dynamics of complex environments using a limited number of measurements, under the assumption of a moderate temporal entanglement.